Abstract
This study investigates the process of forming Anna’s visual and symbolic representations at each stage of the development of relational understanding in solving fractional problems. This study focuses on Anna (pseudonym), a 4th-grade elementary school student in Sidoarjo Regency. Anna possessed the complete process of forming visual and symbolic representations and is the only student who is able to provide logical arguments to support her answer. This research is qualitative in nature with a case study. The results were analyzed using the Miles and Huberman model by reducing the data, presenting the data, and drawing conclusions. Results show the process of forming Anna’s visual and symbolic representations at each stage of the development of relational understanding in solving fractional problems. Anna has difficulty forming visual representations because she has weaknesses in the concept of fractional equations and fractional operations. This resulted in the process of forming symbolic representations and procedural knowledge that tends to be rote. These findings indicate that Anna developed a relational understanding, namely, a conceptual understanding of fractions. The process of forming a visual representation is the main basis before the formation of a symbolic representation.
Highlights
Many elementary school students have difficulty understanding fraction material (Hunt, Welch-ptak & Silva, 2016)
Difficulties experienced by students, especially in terms of adding different types of fractions, is due to students not having an understanding of the fractions equality and experiencing misconceptions about the comparison of the shape and size of the whole fraction (Jannah & Prahmana, 2019; Loong, 2014; Ramadianti, Priatna & Kusnandi 2019)
Anna can explain the contents of the task, wherein she can anticipate the results by guessing and relating to Task of Fractions Representation (TFR) 1
Summary
Many elementary school students have difficulty understanding fraction material (Hunt, Welch-ptak & Silva, 2016). Difficulties experienced by students, especially in terms of adding different types of fractions, is due to students not having an understanding of the fractions equality and experiencing misconceptions about the comparison of the shape and size of the whole fraction (Jannah & Prahmana, 2019; Loong, 2014; Ramadianti, Priatna & Kusnandi 2019). Another difficulty is the students’ failure to represent numerators and denominators visually (Namkung & Fuchs, 2019). The meanings 2 and 3 are written in the form of fractions into or describe them visually with area models (Fitzallen, 2015)
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